Abstract
We use ideas from algebraic geometry and dynamical systems to explain some ways that control points influence the shape of a Bézier curve or patch. In particular, we establish a generalization of Birch’s Theorem and use it to deduce sufficient conditions on the control points for a patch to be injective. We also explain a way that the control points influence the shape via degenerations to regular control polytopes. The natural objects of this investigation are irrational patches, which are a generalization of Krasauskas’s toric patches, and include Bézier and tensor product patches as important special cases.
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References
Dahmen, W.: Convexity and Bernstein-Bézier polynomials. In: Curves and surfaces (Chamonix-Mont-Blanc, 1990), pp. 107–134. Academic Press, Boston (1991)
Craciun, G., Feinberg, M.: Multiple equilibria in complex chemical reaction networks. I. The injectivity property. SIAM J. Appl. Math. 65(5), 1526–1546 (2005)
Krasauskas, R.: Toric surface patches. Adv. Comput. Math. 17(1-2), 89–133 (2002); Advances in geometrical algorithms and representations
Brown, L.D.: Fundamentals of statistical exponential families with applications in statistical decision theory. Institute of Mathematical Statistics Lecture Notes—Monograph Series, 9. Institute of Mathematical Statistics, Hayward, CA (1986)
Darroch, J.N., Ratcliff, D.: Generalized iterative scaling for log-linear models. Ann. Math. Statist. 43, 1470–1480 (1972)
Sottile, F.: Toric ideals, real toric varieties, and the moment map. In: Topics in algebraic geometry and geometric modeling. Contemp. Math., vol. 334, pp. 225–240. Amer. Math. Soc., Providence (2003)
Garcia-Puente, L.D., Sottile, F.: Linear precision for parametric patches. Advances in Computational Mathematics (to appear, 2009)
Karčiauskas, K., Krasauskas, R.: Comparison of different multisided patches using algebraic geometry. In: Laurent, P.J., Sablonniere, P., Schumaker, L. (eds.) Curve and Surface Design: Saint-Malo 1999, pp. 163–172. Vanderbilt University Press, Nashville (2000)
Cox, D.: What is a toric variety? In: Topics in algebraic geometry and geometric modeling. Contemp. Math., vol. 334, pp. 203–223. Amer. Math. Soc., Providence (2003)
DeRose, T., Goldman, R., Hagen, H., Mann, S.: Functional composition algorithms via blossoming. ACM Trans. on Graphics 12, 113–135 (1993)
Fulton, W.: Introduction to toric varieties. Annals of Mathematics Studies, vol. 131. Princeton University Press, Princeton (1993); The William H. Roever Lectures in Geometry
Agresti, A.: Categorical Data Analysis. Wiley series in Probability and Mathematical Statistics. Wiley, New York (1990)
Graf von Bothmer, H.C., Ranestad, K., Sottile, F.: Linear precision for toric surface patches, ArXiv:math/0806.3230 (2007)
Pachter, L., Sturmfels, B. (eds.): Algebraic statistics for computational biology. Cambridge University Press, New York (2005)
Keller, O.: Ganze cremonatransformationen. Monatschr. Math. Phys. 47, 229–306 (1939)
Pinchuk, S.: A counterexample to the strong real Jacobian conjecture. Math. Z. 217(1), 1–4 (1994)
Dahmen, W., Micchelli, C.A.: Convexity of multivariate Bernstein polynomials and box spline surfaces. Studia Sci. Math. Hungar. 23(1-2), 265–287 (1988)
Leroy, R.: Certificats de positivité et minimisation polynomiale dans la base de Bernstein multivariée. PhD thesis, Institut de Recherche Mathématique de Rennes (2008)
Sturmfels, B.: Gröbner bases and convex polytopes. American Mathematical Society, Providence (1996)
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Craciun, G., García-Puente, L.D., Sottile, F. (2010). Some Geometrical Aspects of Control Points for Toric Patches. In: Dæhlen, M., Floater, M., Lyche, T., Merrien, JL., Mørken, K., Schumaker, L.L. (eds) Mathematical Methods for Curves and Surfaces. MMCS 2008. Lecture Notes in Computer Science, vol 5862. Springer, Berlin, Heidelberg. https://doi.org/10.1007/978-3-642-11620-9_9
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DOI: https://doi.org/10.1007/978-3-642-11620-9_9
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